Semiprime Rings with Nilpotent Derivatives

L. O. Chung; Jiang Luh

doi:10.4153/CMB-1981-064-9

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There has been a great deal of work recently concerning the relationship between the commutativity of a ring JR and the existence of certain specified derivations of R. Bell, Herstein, Procesei, Schacher, Ligh, Martindale, Putcha, Wilson, and Yaqub [1, 2, 6, 8, 9, 10, 11, 12, 14] have studied conditions on commutators which imply the commutativity of rings.

References

1. Bell, H., Duo rings, some applications to commutativity theorem, Canad. Math. Bull. 11 (1968), 375-380.Google Scholar

2. Bell, H., Some commutativity results for periodic rings, Acta Math. Sci. Hungarica. 28 (1976), 279-283.Google Scholar

3. Chung, L. O. and Luh, Jiang, Derivations of higher order and commutativity of rings (to appear).Google Scholar

4. Chung, L. O., Luh, Jiang and Richoux, A. N., Derivations and commutativity of rings, Pac. J. Mat. 80 (1979), 77-89.Google Scholar

5. Chung, L. O., Derivations and commutativity of rings II, Pac. J. Math. 85 (1979), 19-34 Google Scholar

6. Herstein, I. N., A condition for the commutativity of rings, Canad. J. Math. 9 (1957), 583-586.Google Scholar

7. Herstein, I. N., A note on derivations, Canad. Math. Bull. 21 (1978), 369-370.Google Scholar

8. Herstein, I. N., Center-like in prime rings, Notices of ams 26 No. 3 (1979) p. A-329.Google Scholar

9. Herstein, I. N., Procesi, C. and Schacher, M., Algebraic valued functions on non-commutative rings, J. of Algebr. 36 (1975), 128-150.Google Scholar

10. Ikeda, M. and Koc, C., On the commutator ideal of certain rings, Arch. Math. 25 (1974), 348-353.Google Scholar

11. Ligh, S., The structure of certain classes of rings and near rings, J. London Math. Soc. (2) 12 (1975), 27-31.Google Scholar

12. Martindale, W. S. III, The commutativity of a special class of rings, Canad. J. Math. 12 (1960), 263-268.Google Scholar

13. Posner, E. C., Derivations in prime rings, Proc. AM. 8 (1960), 1093-1100.Google Scholar

14. Putcha, M. S., Wilson, R. S. and Yaqub, A., Structure of rings satisfying certain identities on commutators, Proc. AM. 32 (1972), 57-62.Google Scholar

Crossref Citations

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Beidar, K. I. Latyshev, V. N. Markov, V. T. Mikhalev, A. V. Skornyakov, L. A. and Tuganbaev, A. A. 1987. Associative rings. Journal of Soviet Mathematics, Vol. 38, Issue. 3, p. 1855.

Mikhalev, A. V. and Pankrat'ev, E. V. 1989. Differential and difference algebra. Journal of Soviet Mathematics, Vol. 45, Issue. 1, p. 912.

Brešar, Matej 1994. One-sided ideals and derivations of prime rings. Proceedings of the American Mathematical Society, Vol. 122, Issue. 4, p. 979.

Brešar, Matej and Hvala, Bojan 1995. On additive maps of prime rings. Bulletin of the Australian Mathematical Society, Vol. 51, Issue. 3, p. 377.

Chang, Chi-Ming and Lee, Tsiu-Kwen 1998. Annihilators of power values of derivations in prime rings. Communications in Algebra, Vol. 26, Issue. 7, p. 2091.

Lee, Tsiu—Kwen 1999. Differential identities of lie ideals or large right ideals in prime rings. Communications in Algebra, Vol. 27, Issue. 2, p. 793.

Brešar, Matej Chebotar, M. A. and Šemrl, Peter 1999. On derivations of prime rings*. Communications in Algebra, Vol. 27, Issue. 7, p. 3129.

Kim, Byungdo 2000. On the Derivations of Semiprime Rings and Noncommutative Banach Algebras. Acta Mathematica Sinica, English Series, Vol. 16, Issue. 1, p. 21.

Jun, Kil-Woung and Kim, Hark-Mahn 2002. THE RANGE OF DERIVATIONS ON BANACH ALGEBRAS. Bulletin of the Korean Mathematical Society, Vol. 39, Issue. 2, p. 211.

Shiue, Wen-Kwei 2003. Annihilators of derivations with Engel conditions on lie ideals. Rendiconti del Circolo Matematico di Palermo, Vol. 52, Issue. 3, p. 505.

Vukman, Joso and Kosi-Ulbl, Irena 2005. Centralisers on rings and algebras. Bulletin of the Australian Mathematical Society, Vol. 71, Issue. 2, p. 225.

Wei, Feng and Xiao, Zhankui 2008. Pairs of derivations on rings and Banach algebras. Demonstratio Mathematica, Vol. 41, Issue. 2,

XU, XIAO-WEI MA, JING and NIU, FENG-WEN 2010. DERIVATIONS HAVING THE SAME POWER VALUES. Journal of Algebra and Its Applications, Vol. 09, Issue. 05, p. 809.

Kim, Byung-Do 2013. JORDAN DERIVATIONS ON PRIME RINGS AND THEIR APPLICATIONS IN BANACH ALGEBRAS, I. Communications of the Korean Mathematical Society, Vol. 28, Issue. 3, p. 535.

Jung, Yong-Soo 2013. GENERALIZED DERIVATIONS AND DERIVATIONS OF RINGS AND BANACH ALGEBRAS. Honam Mathematical Journal, Vol. 35, Issue. 4, p. 625.

Xu, Xiaowei Ma, Jing and Niu, Fengwen 2013. Generalized Derivations Having the Same Power Values with Left Multiplications. Algebra Colloquium, Vol. 20, Issue. 03, p. 369.

Ali, Shakir Salahuddin Khan, Mohammad and Mosa Al-Shomrani, M. 2014. Generalization of Herstein theorem and its applications to range inclusion problems. Journal of the Egyptian Mathematical Society, Vol. 22, Issue. 3, p. 322.

Kim, Byung-Do 2014. JORDAN DERIVATIONS ON PRIME RINGS AND THEIR APPLICATIONS IN BANACH ALGEBRAS, II. Journal of the Chungcheong Mathematical Society, Vol. 27, Issue. 1, p. 65.

Ali, Shakir Ashraf, Mohammad Khan, Mohammad Salahuddin and Vukman, Joso 2014. Commutativity of rings involving additive mappings. Quaestiones Mathematicae, Vol. 37, Issue. 2, p. 215.

Ashraf, Mohammad and Jamal, Malik Rashid 2014. Traces of Permuting n-Additive Maps and Permuting n-Derivations of Rings. Mediterranean Journal of Mathematics, Vol. 11, Issue. 2, p. 287.

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